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INTRODUCTION• SENSi-vityEncoding(SENSE)-parallelimagingtechnique,whereanarrayof
mul+ple,simultaneouslyoperatedreceivercoilsisusedforsignalacquisi+on
• SENSEisbasedonuseofmul+pleRFcoilsandreceivers.Thecoilelementsareusedtomeasuretheanatomicalregionofinterestsimultaneously
• Thisallowsreduc+onofthetotalscan+mebyafactoruptothenumberofcoilelements
• Reconstruc+onintheimagedomain
Reconstruc-onstrategies• strongreconstruc-on-aimsatop+mizingvoxelshape
• weakreconstruc-on-thevoxelshapecriterionisweakerinfavoroftheSNR
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METHODSenseReconstruc-on1. Thecrea+onofanaliased,reducedFOVimageforeachcoilarray
element2. AfullFOVimageiscreatedbyreversingthealiasingeffect(i.e.
unfolding)
S1AA+S1BB S2AA+S2BB
S3AA+S3BB S4AA+S4BB
[y1]=[S1AS1B][y2]=[S2AS2B][A][y3]=[S3AS3B][B][y4]=[S4AS4B]SolvingMatrix-----------à
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RESULTS
Figure3:Parallelacquisi+oninMRIusing8coilarray(a):cartoondepic+on(b):frommatlabcode(clockwise)%%PSUEDOCODEload('brain_8ch.mat');[m,n,t]=size(im);fori=1:timagesc(abs(im(:,:,i)));end %%MULTICOILRECONSTRUCTION
mul+coil_recon=abs(sum(im,3));mul+coil_sq_recon=sqrt(abs(sum(abs(im.^2),3)));
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Figure5:Generatedundersampledimages(clockwise)
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%%SENSERECONSTRUCTIONimf=sense_sg(ima,map,Rx,Ry);figure;imagesc(abs(imf));
%%GENERATEUNDERSAMPLEDIMAGESRx=1;Ry=2;ima=undersample(im,Rx,Ry);
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REFERENCE[1]PruessmannKP,WeigerM,ScheideggerMB,BoesigerP,
“SENSE:Sensi+vityencodingforfastMRI”,Magne+cResonanceinMedicine1999;42(5):952-962
[2]DavidJLarkman,RitaGNunes,“Parallelmagne+c
resonanceimaging”,Phys.Med.Biol.52(2007)R15–R55
[3]“RoleofParallelImaginginMagne+cResonance
Imaging”,DouglasC.Noll&BradleyP.Suoon,DepartmentofBiomedicalEngineering,UniversityofMichiganFieldFunc+onalMRI
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¡ Number of non-zero coefficients in a data vector
¡ Importance due to conservation of energy
¡ Sinusoidal signal for 3 hours in time domain or frequency domain?
¡ Move towards time-frequency transforms
¡ Childlike question on compression
¡ Acceleration technique involving both acquisition and reconstruction paradigms
¡ Technically challenging, pragmatically feasible and clinically valuable
• Good data quality but takes a long time! • Hence, may not be suitable for certain imaging protocols. • Limits spatial and temporal resolutions • Higher spatial resolution aids in morphological analysis of tumors – breast DCE-MRI • Temporal resolution is important for accurate pharmacokinetic analysis. • Several approaches like keyhole, parallel imaging and other fast sequences have been used. 2D FFT
2D IFFT
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Complete data reconstruction
Wavelet
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[1] David L. Donoho, IEEE Transactions on Information theory, Vol.52, no. 4, April 2006 [2] Candes, E.J. et al., IEEE Transactions on Information theory, Vol.52, no.2, Feb. 2006
• Most objects in nature are approximately sparse in a transformed domain. • Utilize above concept to obtain very few measurements and yet reconstruct with high fidelity [1,2]
Only 33% of complete data
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¡ Generate a 2D phantom
¡ Cartesian undersampling of data
¡ Obtain undersampled data and zfwdc recon
¡ Choice of ROI if required for diagnostic evaluation purposes
¡ Recon params, post L-curve optimization
¡ Nonlinear conjugate gradient iterative reconstruction
¡ Comparative quality
¡ Every MRI method: § Angiography § DWI/DTI/SWI/DCE-MRI/ASL § fMRI/MRSI/CMR § ….
¡ Because MRI is inherently a slow acquisition process, mostly dictated by the physics of acquisition
¡ Magnetic Resonance Fingerprinting
1. Rapid 1H MR metabolic imaging
2. Accelerated DCE-MRI
3. Swifter Sweep Imaging with Fourier Transform (SWIFT) MRI
¡ It has been well established that magnetic resonance imaging (MRI) provides critical information about cancer [3].
¡ Magnetic resonance spectroscopic imaging (MRSI) furthers this capability by providing information about the presence of certain ‘metabolites’ which are known to be important prognostic markers of cancer [4] (stroke, AD, energy metabolism, TCA cycle).
¡ MRSI provides information about the spatial distribution of these metabolites, hence enabling metabolic imaging.
[3] Huk WJ et al., Neurosurgical Review 7(4) 1984; [4] Preul MC et al., Nat. Med. 2(3) 1996;
¡ Increased choline level
¡ Reduced N-Acetylaspartate (NAA) level
¡ Reduced creatine level
[5] H Kugel et al., Radiology 183 June 1992
[5]
CANCER
NORMAL
¡ Long acquisition times for MRSI § A typical MRSI protocol (32 X 32 X 512) takes ~ 20 minutes § Difficult to maintain anatomical posture for long time § Increases patient discomfort, likelihood of early termination of study § Discourages routine clinical use of this powerful MRI technique
¡ To increase throughput (decreased scanner time, technician time)
¡ Reduction of acquisition time is usually accomplished by under sampling measured data (k-space).
¡ Limitations of Shannon-Nyquist criterion.
¡ Compressed sensing provides a framework to achieve sub-Nyquist sampling rates with good data fidelity.
Brain - normal (N=6)
Brain - cancer (N=2)
Prostate -cancer (N=2)
MRSI data Scanner TR(ms) TE(ms) # Averages Grid Size FOV (mm3)
Brain - normal (N=6)
Siemens 3.0T Trio Tim 1700 270 4 16 x 16 x 1024 100 x 100 x 15
Brain cancer (N=2)
Philips 3.0T Achieva 1000 112
112 2 2
18 x 21 x 1024 19 x 22 x 1024
180 x 210 x15 190 x 220 x 15
Prostate cancer (N=2)
Philips 3.0T Achieva
1200 1000
140 140
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14 x 10 x 1024 16 x 12 x 1024
25 x 50 x 33 20 x 51 x 26
¡ Minimal data processing done using jMRUI [7]
¡ FID Apodization – Gaussian (~3Hz)
¡ Removal of water peak using HLSVD
¡ Phase correction § To allow correct integration of the real part of the spectra
¡ QUEST based quantitation. [8] § To generate specific metabolite maps.
[7] A. Naressi, et al., Computers in Biology and Medicine, vol. 31, 2001. [8] H. Ratiney, et al., Magnetic Resonance Materials in Physics Biology and Medicine, vol. 16, 2004.
Brain cancer
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Prostate cancer Normal Cancer Normal Cancer
NAA Cr Cho NAA
Cr Cho Cr2 Cr2 Cr
Cho Cit Cit Cho + Cr
§ Mean ± SD of pooled data for each data type
§ 2 tailed paired t-test
§ Ratio: CNI for brain data and (Cho + cr)/Cit for prostate data
§ Excluded voxels with denominator value of 0 in 1X case
§ For CS cases, if the denominator had a value of 0, the ratio was set to 0
§ P value less than 0.05 was chosen as a significant difference (* p <0.05)
NAA (a.u.)
Cr (a.u.)
Cho (a.u.)
Cit (a.u.)
Ratio
Brain (Normal)
1X 200 ± 96.8 51.83 ± 27.6 13.8 ± 8.87 0.075 ± 0.047
2X 200 ± 98.9 51.99 ± 34.5 13.8 ± 10.2 0.073 ± 0.064
5X 202 ± 110 51.71 ± 30.7 13. 9 ± 10.6 0.082 ± 0.152
10X 241 ± 138* 65.22 ± 39.3* 17.9 ± 13.2* 0.086 ± 0.083*
Brain (Cancer)
1X 10.7 ± 6.35 4.23 ± 2.43 3.21 ± 1.38 0.468 ± 0.519
2X 10.8 ± 6.45 4.27 ± 2.60 3.21 ± 1.37 0.625 ± 1.50
5X 10.6 ± 7.42 4.19 ± 2.35 3.21 ± 1.36 0.712 ± 1.82
10X 11.1 ± 8.78 3.72 ± 1.72* 3.27 ± 1.47 0.837 ± 1.89*
Prostate (Cancer)
1X 499 ± 821 2010 ± 1730 188 ± 166 19.25 ± 25.23
2X 427 ± 830 1850 ± 1460 194 ± 131 14.10 ± 10.21
5X 382 ± 541 1830 ± 1450 193 ± 131 16.12 ± 16.44
10X 378 ± 540 1470 ± 958* 135 ± 111* 16.38 ± 23.59
N = total number of elements of the MRSI data; Θ, Θ’ = the data reconstructed from full k-space and undersampled k-space respectively.
∑=
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¡ Application of compressed sensing on 1H MRSI has been performed for the first time
¡ It has been demonstrated that compressed sensing based reconstruction can be successfully applied on 1H MRSI in vivo human brain (normal and cancer), prostate cancer data and in vitro, computer generated phantom data sets
¡ Our results indicate a potential to reduce MRSI acquisition times by 75% thus significantly reducing the time spent by the patient in the MR scanner for spectroscopic studies
¡ Current and future work involves the implementation of compressed sensing based pulse sequences on preclinical and clinical scanners
¡ Other groups in the world are working on this demonstration now!
¡ Rapid 1H MR metabolic imaging
¡ Accelerated DCE-MRI
¡ Swifter Sweep Imaging with Fourier Transform (SWIFT) MRI
C(t) = f(ΔR1(t))
T1 – weighted images for baseline
T1 shortening contrast agent
[10] Yankeelov TE, et. al MRI;23(4). 2005 *Model implemented by Dr. Vikram Kodibagkar in MATLAB
[10]
Tissue perfusion, microvascular density and extravascular -extracellular volume -- tumor staging, monitor treatment response
Spre(ω) = Lpre(ω) + Hpre(ω) (1a)
Spost(ω) = Lpost(ω) + Hpre(ω) (1b)
Є( Idiff) = || FIdiff – ydiff||2 + λLI || WIdiff ||1 +λTV(Idiff) (2)
Keyhole for DCE
CS for DCE
Ipost-contrast Ipre-contrast Idiff
Data was normalized to a range of 0 to 1 before retrospective reconstruction
Spost(ω) Spre(ω) ydiff
[11] Vanvaals JJ et. al. JMRI; 3(4) 1993 [12] Jim J et. al. IEEE TMI 2008 [13] Lustig M et. al. MRM;58(6) 2007
[11]
[12,13]
¡ 5 DCE-MRI breast cancer data sets consisting of 64 frames (4 pre-contrast images and 60 post-contrast images) were used for retrospective reconstructions.
¡ The contrast agent used was Omniscan (intravenously administered through the tail vein at a dose of 0.1 mmol/kg).
¡ Reconstructions based on 2 approaches: keyhole and compressed sensing, were performed as function of masks and acceleration factors were performed.
¡ These reconstructions were quantified by the root mean square error metric defined below
∑=
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Keyhole
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Masks Recon
Starts at frame 1 Starts at frame 6 (post-contrast)
Keyhole CS
Keyhole
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CS_Glines
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Muscle
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Poorly perfused region
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Well perfused region
¡ It has been shown here and previously that DCE MRI can be reliably accelerated through methods like compressed sensing and keyhole reconstructions to obtain increased spatial and/or temporal resolution.
¡ CS based masks – Gauss and Gthresh provide better performance when compared to Glines mask, which out do the keyhole masks as observed by the RMSE graphs.
¡ Keyhole based masks – keyhole mask performs relatively poorer when compared to keythresh and keylines masks
¡ Acceleration factors – the values of RMSE increases with acceleration as expected (not shown); the CS masks show a RMSE of less than 0.075 even at an acceleration factor of 5 while keyhole masks result in a RMSE of less than 0.1
¡ Rapid 1H MR metabolic imaging
¡ Accelerated DCE-MRI
¡ Swifter Sweep Imaging with Fourier Transform (SWIFT) MRI
[14] D.Idiyatullin et al., JMR, 181, 2006. [14]
§ Sweep imaging with Fourier transformation [14]
§ Time domain signals are acquired during a swept radiofrequency excitation in a time shared way
§ This results in a significantly negligible echo time.
§ Insensitive to motion, restricted dynamic range, low gradient noise
GRE SWIFT Photograph
Bovine tibia
¡ Full k-space recon was performed using gridding. The volume was restricted to a range of [0,1] by normalizing it to the highest absolute value.
¡ Prospective implementation is straight forward due to the nature of k-space trajectory. Acceleration of 5.33 X was achieved – directly proportional to time saved
¡ MR data is sparse in the total variation domain. Since the data in this case is 3D, a 3D total variation norm is most apt.
¡ Reconstruction involves minimization of the convex functional given below. This is accomplished by a custom implementation of non-linear conjugate gradient algorithm.
Є(m) = || Fum – y||2 +λTV TV(m)
where m is the desired MRI volume, Fu is the Fourier transform operator, TV is the 3D total variation operator, ||.||2 is the L2 norm operator, λTV is the regularization parameter for the TV term respectively, and
Є is the value of the cost function.
¡ The initial estimate of the volume is given by the zero-filled case with density compensation (zfwdc). This produces artifacts which are incoherent as can be seen in the zfwdc images.
¡ A total of 8 iterations were used and the recon was performed in 4 mins.
¡ NRMSE given by RMSE/ range of input; i.e. 1; hence NRMSE = RMSE calculated as given below
N = total number of elements of the MRI volume; Θ, Θ’ = the data reconstructed from full k-space and undersampled k-space respectively.
∑=
Θ−Θ=N
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50 100 1500.0
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nsity
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50 100 1500.0
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¡ “Review on CS MRI” Critical reviews in biomedical engineering 2013
¡ http://nuit-blanche.blogspot.in/
¡ Miki Lustig, UC Berkley
¡ John M Pauly, Stanford
¡ www.ismrm.org
PEOPLE § Dr. Vikram D. Kodibagkar
§ CSI project § Hyeonman Baek, Ph.D. § Matthew Lewis, Ph.D. § Sandeep K. Ganji, B. Tech. § Yao Ding, M.S. § Robert D. Sims, M.D. § Changho Choi, Ph.D. § Elizabeth Maher, M.D., Ph.D.
§ DCE project § Praveen K. Gulaka, M.S.
§ SWIFT project § Matthew Lewis, Ph.D. § Steen Moeller, Ph.D. § Curtis A. Corum, Ph.D.
FUNDING
§ DST-TSD grant (PI: Geethanath) § KFIST grant (PI: Geethanath) § Pilot grant (PI: Kodibagkar) from
UL1RR024982, (PI: Milton Packer) § ARP#010019-0056-2007 (PI: Kodibagkar) § R21CA132096-01A1 (PI: Kodibagkar) § W81XWH-05-1-0223 (PI: Kodibagkar) § R21 CA139688 (PI: Corum) § S10 RR023730 (PI: Garwood) § P41 RR008079 (PI: Garwood)
Acknowledgements/Contactinfo
• MIRCmembers,MedicalElectronicsmembers• Management,DSI• AcademicandIndustrialpartners
• MIRC_HOME_OFFLINE(hop://www.dayanandasagar.edu/mirc-home.html)• MIRC_SHARING_OFFLINE• MIRC_PEOPLE_OFFLINE• sairam.geethanath@dayanandasagar.edu
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